Is it true than an aperiodic, ergodic, minimal and equicontinuous dynamical system on a compact metric space is totally ergodic ?
According to some results I found in some books, a rotation on a compact metric group is equicontinous, and it is minimal and totally ergodic whenever it is ergodic.
The answer is no in this generality! If you consider the classical odometer (i.e. addition by 1 on 2-adic integers) then its second power (addition by 2) is not minimal. This second power preserves the numbers starting with 0 (the "even numbers") and the numbers starting with 1 (the "odd numbers"). But of course this example is totally disconnected.
Just knowing that a transformation $T$ is minimal is no guarantee that $T^n$ is also minimal. For example, let $T_1$ be the non-identity homeomorphism of a two-point metric space and let let $T_2$ be an aperiodic, minimal, equicontinuous, uniquely ergodic transformation of a compact metric space (for example, an irrational circle rotation). Then $T_1 \times T_2$ is minimal and uniquely ergodic, but $T_1^2 \times T_2^2$ has two nonempty, disjoint, closed invariant sets, and the unique invariant measure for $T_1 \times T_2$ is not ergodic for $T_1^2 \times T_2^2$, since it gives both "halves" of the phase space positive measure, but those "halves" are invariant sets for $T_1^2 \times T_2^2$.
